International audienceIn approximation theory, it is standard to approximate functions by polynomials expressed in the Chebyshev basis. Evaluating a polynomial $f$ of degree n given in the Chebyshev basis can be done in $O(n)$ arithmetic operations using the Clenshaw algorithm. Unfortunately, the evaluation of $f$ on an interval $I$ using the Clenshaw algorithm with interval arithmetic returns an interval of width exponential in $n$. We describe a variant of the Clenshaw algorithm based on ball arithmetic that returns an interval of width quadratic in $n$ for an interval of small enough width. As an application, our variant of the Clenshaw algorithm can be used to design an efficient root finding algorithm
The integer Chebyshev problem deals with finding polynomials of degree at most n with integer coeffi...
The Chebyshev approximation problem is usually described as to find the polynomial (or the element o...
17 pagesInternational audiencePerforming numerical computations, yet being able to provide rigorous ...
International audienceIn approximation theory, it is standard to approximate functions by polynomial...
Root finding for a function or a polynomial that is smooth on the interval [a; b], but otherwise arb...
AbstractFor a function f(x) that is smooth on the interval x∈[a,b] but otherwise arbitrary, the real...
We develop a simple two-step algorithm for enclosing Chebyshev expansions whose cost is linear in te...
AbstractFor a polynomial p(x) of a degree n, we study its interpolation and evaluation on a set of C...
AbstractBy analysing the effects of rounding errors from all sources, it is shown that the coefficie...
AbstractIn this paper, we present rounding error bounds of recent parallel versions of Forsythe's an...
summary:The polynomial approximation to a function in a semi-infinite interval has been worked out b...
AbstractStable polynomial evaluation and interpolation at n Chebyshev or adjusted (expanded) Chebysh...
V diplomskem delu bomo predstavili Čebiševe polinome prve in druge vrste, njihove lastnosti ter Čebi...
We exhibit a numerical technique based on Newton’s method for finding all the roots of Legendre and ...
AbstractWhen two or more branches of a function merge, the Chebyshev series of u(λ) will converge ve...
The integer Chebyshev problem deals with finding polynomials of degree at most n with integer coeffi...
The Chebyshev approximation problem is usually described as to find the polynomial (or the element o...
17 pagesInternational audiencePerforming numerical computations, yet being able to provide rigorous ...
International audienceIn approximation theory, it is standard to approximate functions by polynomial...
Root finding for a function or a polynomial that is smooth on the interval [a; b], but otherwise arb...
AbstractFor a function f(x) that is smooth on the interval x∈[a,b] but otherwise arbitrary, the real...
We develop a simple two-step algorithm for enclosing Chebyshev expansions whose cost is linear in te...
AbstractFor a polynomial p(x) of a degree n, we study its interpolation and evaluation on a set of C...
AbstractBy analysing the effects of rounding errors from all sources, it is shown that the coefficie...
AbstractIn this paper, we present rounding error bounds of recent parallel versions of Forsythe's an...
summary:The polynomial approximation to a function in a semi-infinite interval has been worked out b...
AbstractStable polynomial evaluation and interpolation at n Chebyshev or adjusted (expanded) Chebysh...
V diplomskem delu bomo predstavili Čebiševe polinome prve in druge vrste, njihove lastnosti ter Čebi...
We exhibit a numerical technique based on Newton’s method for finding all the roots of Legendre and ...
AbstractWhen two or more branches of a function merge, the Chebyshev series of u(λ) will converge ve...
The integer Chebyshev problem deals with finding polynomials of degree at most n with integer coeffi...
The Chebyshev approximation problem is usually described as to find the polynomial (or the element o...
17 pagesInternational audiencePerforming numerical computations, yet being able to provide rigorous ...